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math_extra.h
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/* -*- c++ -*- ----------------------------------------------------------
LAMMPS - Large-scale Atomic/Molecular Massively Parallel Simulator
http://lammps.sandia.gov, Sandia National Laboratories
Steve Plimpton, sjplimp@sandia.gov
Copyright (2003) Sandia Corporation. Under the terms of Contract
DE-AC04-94AL85000 with Sandia Corporation, the U.S. Government retains
certain rights in this software. This software is distributed under
the GNU General Public License.
See the README file in the top-level LAMMPS directory.
------------------------------------------------------------------------- */
/* ----------------------------------------------------------------------
Contributing author: Mike Brown (SNL)
------------------------------------------------------------------------- */
#ifndef LMP_MATH_EXTRA_H
#define LMP_MATH_EXTRA_H
#include <math.h>
#include <stdio.h>
#include <string.h>
#include "error.h"
namespace MathExtra {
// 3 vector operations
inline void copy3(const double *v, double *ans);
inline void zero3(double *v);
inline void norm3(double *v);
inline void normalize3(const double *v, double *ans);
inline void snormalize3(const double, const double *v, double *ans);
inline void negate3(double *v);
inline void scale3(double s, double *v);
inline void add3(const double *v1, const double *v2, double *ans);
inline void scaleadd3(double s, const double *v1, const double *v2,
double *ans);
inline void sub3(const double *v1, const double *v2, double *ans);
inline double len3(const double *v);
inline double lensq3(const double *v);
inline double dot3(const double *v1, const double *v2);
inline void cross3(const double *v1, const double *v2, double *ans);
// 3x3 matrix operations
inline void col2mat(const double *ex, const double *ey, const double *ez,
double m[3][3]);
inline double det3(const double mat[3][3]);
inline void diag_times3(const double *d, const double m[3][3],
double ans[3][3]);
inline void times3_diag(const double m[3][3], const double *d,
double ans[3][3]);
inline void plus3(const double m[3][3], const double m2[3][3],
double ans[3][3]);
inline void times3(const double m[3][3], const double m2[3][3],
double ans[3][3]);
inline void transpose_times3(const double m[3][3], const double m2[3][3],
double ans[3][3]);
inline void times3_transpose(const double m[3][3], const double m2[3][3],
double ans[3][3]);
inline void invert3(const double mat[3][3], double ans[3][3]);
inline void matvec(const double mat[3][3], const double *vec, double *ans);
inline void matvec(const double *ex, const double *ey, const double *ez,
const double *vec, double *ans);
inline void transpose_matvec(const double mat[3][3], const double *vec,
double *ans);
inline void transpose_matvec(const double *ex, const double *ey,
const double *ez, const double *v,
double *ans);
inline void transpose_diag3(const double m[3][3], const double *d,
double ans[3][3]);
inline void vecmat(const double *v, const double m[3][3], double *ans);
inline void scalar_times3(const double f, double m[3][3]);
void write3(const double mat[3][3]);
int mldivide3(const double mat[3][3], const double *vec, double *ans);
int jacobi(double matrix[3][3], double *evalues, double evectors[3][3]);
void rotate(double matrix[3][3], int i, int j, int k, int l,
double s, double tau);
void richardson(double *q, double *m, double *w, double *moments, double dtq);
void no_squish_rotate(int k, double *p, double *q, double *inertia,
double dt);
// shape matrix operations
// upper-triangular 3x3 matrix stored in Voigt notation as 6-vector
inline void multiply_shape_shape(const double *one, const double *two,
double *ans);
// quaternion operations
inline void qnormalize(double *q);
inline void qconjugate(double *q, double *qc);
inline void vecquat(double *a, double *b, double *c);
inline void quatvec(double *a, double *b, double *c);
inline void quatquat(double *a, double *b, double *c);
inline void invquatvec(double *a, double *b, double *c);
inline void axisangle_to_quat(const double *v, const double angle,
double *quat);
void angmom_to_omega(double *m, double *ex, double *ey, double *ez,
double *idiag, double *w);
void omega_to_angmom(double *w, double *ex, double *ey, double *ez,
double *idiag, double *m);
void mq_to_omega(double *m, double *q, double *moments, double *w);
void exyz_to_q(double *ex, double *ey, double *ez, double *q);
void q_to_exyz(double *q, double *ex, double *ey, double *ez);
void quat_to_mat(const double *quat, double mat[3][3]);
void quat_to_mat_trans(const double *quat, double mat[3][3]);
// rotation operations
inline void rotation_generator_x(const double m[3][3], double ans[3][3]);
inline void rotation_generator_y(const double m[3][3], double ans[3][3]);
inline void rotation_generator_z(const double m[3][3], double ans[3][3]);
void BuildRxMatrix(double R[3][3], const double angle);
void BuildRyMatrix(double R[3][3], const double angle);
void BuildRzMatrix(double R[3][3], const double angle);
// moment of inertia operations
void inertia_ellipsoid(double *shape, double *quat, double mass,
double *inertia);
void inertia_line(double length, double theta, double mass,
double *inertia);
void inertia_triangle(double *v0, double *v1, double *v2,
double mass, double *inertia);
void inertia_triangle(double *idiag, double *quat, double mass,
double *inertia);
}
/* ----------------------------------------------------------------------
copy a vector, return in ans
------------------------------------------------------------------------- */
inline void MathExtra::copy3(const double *v, double *ans)
{
ans[0] = v[0];
ans[1] = v[1];
ans[2] = v[2];
}
/* ----------------------------------------------------------------------
set vector equal to zero
------------------------------------------------------------------------- */
inline void MathExtra::zero3(double *v)
{
v[0] = 0.0;
v[1] = 0.0;
v[2] = 0.0;
}
/* ----------------------------------------------------------------------
normalize a vector in place
------------------------------------------------------------------------- */
inline void MathExtra::norm3(double *v)
{
double scale = 1.0/sqrt(v[0]*v[0]+v[1]*v[1]+v[2]*v[2]);
v[0] *= scale;
v[1] *= scale;
v[2] *= scale;
}
/* ----------------------------------------------------------------------
normalize a vector, return in ans
------------------------------------------------------------------------- */
inline void MathExtra::normalize3(const double *v, double *ans)
{
double scale = 1.0/sqrt(v[0]*v[0]+v[1]*v[1]+v[2]*v[2]);
ans[0] = v[0]*scale;
ans[1] = v[1]*scale;
ans[2] = v[2]*scale;
}
/* ----------------------------------------------------------------------
scale a vector to length
------------------------------------------------------------------------- */
inline void MathExtra::snormalize3(const double length, const double *v,
double *ans)
{
double scale = length/sqrt(v[0]*v[0]+v[1]*v[1]+v[2]*v[2]);
ans[0] = v[0]*scale;
ans[1] = v[1]*scale;
ans[2] = v[2]*scale;
}
/* ----------------------------------------------------------------------
negate vector v
------------------------------------------------------------------------- */
inline void MathExtra::negate3(double *v)
{
v[0] = -v[0];
v[1] = -v[1];
v[2] = -v[2];
}
/* ----------------------------------------------------------------------
scale vector v by s
------------------------------------------------------------------------- */
inline void MathExtra::scale3(double s, double *v)
{
v[0] *= s;
v[1] *= s;
v[2] *= s;
}
/* ----------------------------------------------------------------------
ans = v1 + v2
------------------------------------------------------------------------- */
inline void MathExtra::add3(const double *v1, const double *v2, double *ans)
{
ans[0] = v1[0] + v2[0];
ans[1] = v1[1] + v2[1];
ans[2] = v1[2] + v2[2];
}
/* ----------------------------------------------------------------------
ans = s*v1 + v2
------------------------------------------------------------------------- */
inline void MathExtra::scaleadd3(double s, const double *v1,
const double *v2, double *ans)
{
ans[0] = s*v1[0] + v2[0];
ans[1] = s*v1[1] + v2[1];
ans[2] = s*v1[2] + v2[2];
}
/* ----------------------------------------------------------------------
ans = v1 - v2
------------------------------------------------------------------------- */
inline void MathExtra::sub3(const double *v1, const double *v2, double *ans)
{
ans[0] = v1[0] - v2[0];
ans[1] = v1[1] - v2[1];
ans[2] = v1[2] - v2[2];
}
/* ----------------------------------------------------------------------
length of vector v
------------------------------------------------------------------------- */
inline double MathExtra::len3(const double *v)
{
return sqrt(v[0]*v[0] + v[1]*v[1] + v[2]*v[2]);
}
/* ----------------------------------------------------------------------
squared length of vector v, or dot product of v with itself
------------------------------------------------------------------------- */
inline double MathExtra::lensq3(const double *v)
{
return v[0]*v[0] + v[1]*v[1] + v[2]*v[2];
}
/* ----------------------------------------------------------------------
dot product of 2 vectors
------------------------------------------------------------------------- */
inline double MathExtra::dot3(const double *v1, const double *v2)
{
return v1[0]*v2[0]+v1[1]*v2[1]+v1[2]*v2[2];
}
/* ----------------------------------------------------------------------
cross product of 2 vectors
------------------------------------------------------------------------- */
inline void MathExtra::cross3(const double *v1, const double *v2, double *ans)
{
ans[0] = v1[1]*v2[2] - v1[2]*v2[1];
ans[1] = v1[2]*v2[0] - v1[0]*v2[2];
ans[2] = v1[0]*v2[1] - v1[1]*v2[0];
}
/* ----------------------------------------------------------------------
construct matrix from 3 column vectors
------------------------------------------------------------------------- */
void MathExtra::col2mat(const double *ex, const double *ey, const double *ez,
double m[3][3])
{
m[0][0] = ex[0];
m[1][0] = ex[1];
m[2][0] = ex[2];
m[0][1] = ey[0];
m[1][1] = ey[1];
m[2][1] = ey[2];
m[0][2] = ez[0];
m[1][2] = ez[1];
m[2][2] = ez[2];
}
/* ----------------------------------------------------------------------
determinant of a matrix
------------------------------------------------------------------------- */
inline double MathExtra::det3(const double m[3][3])
{
double ans = m[0][0]*m[1][1]*m[2][2] - m[0][0]*m[1][2]*m[2][1] -
m[1][0]*m[0][1]*m[2][2] + m[1][0]*m[0][2]*m[2][1] +
m[2][0]*m[0][1]*m[1][2] - m[2][0]*m[0][2]*m[1][1];
return ans;
}
/* ----------------------------------------------------------------------
diagonal matrix times a full matrix
------------------------------------------------------------------------- */
inline void MathExtra::diag_times3(const double *d, const double m[3][3],
double ans[3][3])
{
ans[0][0] = d[0]*m[0][0];
ans[0][1] = d[0]*m[0][1];
ans[0][2] = d[0]*m[0][2];
ans[1][0] = d[1]*m[1][0];
ans[1][1] = d[1]*m[1][1];
ans[1][2] = d[1]*m[1][2];
ans[2][0] = d[2]*m[2][0];
ans[2][1] = d[2]*m[2][1];
ans[2][2] = d[2]*m[2][2];
}
/* ----------------------------------------------------------------------
full matrix times a diagonal matrix
------------------------------------------------------------------------- */
void MathExtra::times3_diag(const double m[3][3], const double *d,
double ans[3][3])
{
ans[0][0] = m[0][0]*d[0];
ans[0][1] = m[0][1]*d[1];
ans[0][2] = m[0][2]*d[2];
ans[1][0] = m[1][0]*d[0];
ans[1][1] = m[1][1]*d[1];
ans[1][2] = m[1][2]*d[2];
ans[2][0] = m[2][0]*d[0];
ans[2][1] = m[2][1]*d[1];
ans[2][2] = m[2][2]*d[2];
}
/* ----------------------------------------------------------------------
add two matrices
------------------------------------------------------------------------- */
inline void MathExtra::plus3(const double m[3][3], const double m2[3][3],
double ans[3][3])
{
ans[0][0] = m[0][0]+m2[0][0];
ans[0][1] = m[0][1]+m2[0][1];
ans[0][2] = m[0][2]+m2[0][2];
ans[1][0] = m[1][0]+m2[1][0];
ans[1][1] = m[1][1]+m2[1][1];
ans[1][2] = m[1][2]+m2[1][2];
ans[2][0] = m[2][0]+m2[2][0];
ans[2][1] = m[2][1]+m2[2][1];
ans[2][2] = m[2][2]+m2[2][2];
}
/* ----------------------------------------------------------------------
multiply mat1 times mat2
------------------------------------------------------------------------- */
inline void MathExtra::times3(const double m[3][3], const double m2[3][3],
double ans[3][3])
{
ans[0][0] = m[0][0]*m2[0][0] + m[0][1]*m2[1][0] + m[0][2]*m2[2][0];
ans[0][1] = m[0][0]*m2[0][1] + m[0][1]*m2[1][1] + m[0][2]*m2[2][1];
ans[0][2] = m[0][0]*m2[0][2] + m[0][1]*m2[1][2] + m[0][2]*m2[2][2];
ans[1][0] = m[1][0]*m2[0][0] + m[1][1]*m2[1][0] + m[1][2]*m2[2][0];
ans[1][1] = m[1][0]*m2[0][1] + m[1][1]*m2[1][1] + m[1][2]*m2[2][1];
ans[1][2] = m[1][0]*m2[0][2] + m[1][1]*m2[1][2] + m[1][2]*m2[2][2];
ans[2][0] = m[2][0]*m2[0][0] + m[2][1]*m2[1][0] + m[2][2]*m2[2][0];
ans[2][1] = m[2][0]*m2[0][1] + m[2][1]*m2[1][1] + m[2][2]*m2[2][1];
ans[2][2] = m[2][0]*m2[0][2] + m[2][1]*m2[1][2] + m[2][2]*m2[2][2];
}
/* ----------------------------------------------------------------------
multiply the transpose of mat1 times mat2
------------------------------------------------------------------------- */
inline void MathExtra::transpose_times3(const double m[3][3],
const double m2[3][3],double ans[3][3])
{
ans[0][0] = m[0][0]*m2[0][0] + m[1][0]*m2[1][0] + m[2][0]*m2[2][0];
ans[0][1] = m[0][0]*m2[0][1] + m[1][0]*m2[1][1] + m[2][0]*m2[2][1];
ans[0][2] = m[0][0]*m2[0][2] + m[1][0]*m2[1][2] + m[2][0]*m2[2][2];
ans[1][0] = m[0][1]*m2[0][0] + m[1][1]*m2[1][0] + m[2][1]*m2[2][0];
ans[1][1] = m[0][1]*m2[0][1] + m[1][1]*m2[1][1] + m[2][1]*m2[2][1];
ans[1][2] = m[0][1]*m2[0][2] + m[1][1]*m2[1][2] + m[2][1]*m2[2][2];
ans[2][0] = m[0][2]*m2[0][0] + m[1][2]*m2[1][0] + m[2][2]*m2[2][0];
ans[2][1] = m[0][2]*m2[0][1] + m[1][2]*m2[1][1] + m[2][2]*m2[2][1];
ans[2][2] = m[0][2]*m2[0][2] + m[1][2]*m2[1][2] + m[2][2]*m2[2][2];
}
/* ----------------------------------------------------------------------
multiply mat1 times transpose of mat2
------------------------------------------------------------------------- */
inline void MathExtra::times3_transpose(const double m[3][3],
const double m2[3][3],double ans[3][3])
{
ans[0][0] = m[0][0]*m2[0][0] + m[0][1]*m2[0][1] + m[0][2]*m2[0][2];
ans[0][1] = m[0][0]*m2[1][0] + m[0][1]*m2[1][1] + m[0][2]*m2[1][2];
ans[0][2] = m[0][0]*m2[2][0] + m[0][1]*m2[2][1] + m[0][2]*m2[2][2];
ans[1][0] = m[1][0]*m2[0][0] + m[1][1]*m2[0][1] + m[1][2]*m2[0][2];
ans[1][1] = m[1][0]*m2[1][0] + m[1][1]*m2[1][1] + m[1][2]*m2[1][2];
ans[1][2] = m[1][0]*m2[2][0] + m[1][1]*m2[2][1] + m[1][2]*m2[2][2];
ans[2][0] = m[2][0]*m2[0][0] + m[2][1]*m2[0][1] + m[2][2]*m2[0][2];
ans[2][1] = m[2][0]*m2[1][0] + m[2][1]*m2[1][1] + m[2][2]*m2[1][2];
ans[2][2] = m[2][0]*m2[2][0] + m[2][1]*m2[2][1] + m[2][2]*m2[2][2];
}
/* ----------------------------------------------------------------------
invert a matrix
does NOT check for singular or badly scaled matrix
------------------------------------------------------------------------- */
inline void MathExtra::invert3(const double m[3][3], double ans[3][3])
{
double den = m[0][0]*m[1][1]*m[2][2]-m[0][0]*m[1][2]*m[2][1];
den += -m[1][0]*m[0][1]*m[2][2]+m[1][0]*m[0][2]*m[2][1];
den += m[2][0]*m[0][1]*m[1][2]-m[2][0]*m[0][2]*m[1][1];
ans[0][0] = (m[1][1]*m[2][2]-m[1][2]*m[2][1]) / den;
ans[0][1] = -(m[0][1]*m[2][2]-m[0][2]*m[2][1]) / den;
ans[0][2] = (m[0][1]*m[1][2]-m[0][2]*m[1][1]) / den;
ans[1][0] = -(m[1][0]*m[2][2]-m[1][2]*m[2][0]) / den;
ans[1][1] = (m[0][0]*m[2][2]-m[0][2]*m[2][0]) / den;
ans[1][2] = -(m[0][0]*m[1][2]-m[0][2]*m[1][0]) / den;
ans[2][0] = (m[1][0]*m[2][1]-m[1][1]*m[2][0]) / den;
ans[2][1] = -(m[0][0]*m[2][1]-m[0][1]*m[2][0]) / den;
ans[2][2] = (m[0][0]*m[1][1]-m[0][1]*m[1][0]) / den;
}
/* ----------------------------------------------------------------------
matrix times vector
------------------------------------------------------------------------- */
inline void MathExtra::matvec(const double m[3][3], const double *v,
double *ans)
{
ans[0] = m[0][0]*v[0] + m[0][1]*v[1] + m[0][2]*v[2];
ans[1] = m[1][0]*v[0] + m[1][1]*v[1] + m[1][2]*v[2];
ans[2] = m[2][0]*v[0] + m[2][1]*v[1] + m[2][2]*v[2];
}
/* ----------------------------------------------------------------------
matrix times vector
------------------------------------------------------------------------- */
inline void MathExtra::matvec(const double *ex, const double *ey,
const double *ez, const double *v, double *ans)
{
ans[0] = ex[0]*v[0] + ey[0]*v[1] + ez[0]*v[2];
ans[1] = ex[1]*v[0] + ey[1]*v[1] + ez[1]*v[2];
ans[2] = ex[2]*v[0] + ey[2]*v[1] + ez[2]*v[2];
}
/* ----------------------------------------------------------------------
transposed matrix times vector
------------------------------------------------------------------------- */
inline void MathExtra::transpose_matvec(const double m[3][3], const double *v,
double *ans)
{
ans[0] = m[0][0]*v[0] + m[1][0]*v[1] + m[2][0]*v[2];
ans[1] = m[0][1]*v[0] + m[1][1]*v[1] + m[2][1]*v[2];
ans[2] = m[0][2]*v[0] + m[1][2]*v[1] + m[2][2]*v[2];
}
/* ----------------------------------------------------------------------
transposed matrix times vector
------------------------------------------------------------------------- */
inline void MathExtra::transpose_matvec(const double *ex, const double *ey,
const double *ez, const double *v,
double *ans)
{
ans[0] = ex[0]*v[0] + ex[1]*v[1] + ex[2]*v[2];
ans[1] = ey[0]*v[0] + ey[1]*v[1] + ey[2]*v[2];
ans[2] = ez[0]*v[0] + ez[1]*v[1] + ez[2]*v[2];
}
/* ----------------------------------------------------------------------
transposed matrix times diagonal matrix
------------------------------------------------------------------------- */
inline void MathExtra::transpose_diag3(const double m[3][3], const double *d,
double ans[3][3])
{
ans[0][0] = m[0][0]*d[0];
ans[0][1] = m[1][0]*d[1];
ans[0][2] = m[2][0]*d[2];
ans[1][0] = m[0][1]*d[0];
ans[1][1] = m[1][1]*d[1];
ans[1][2] = m[2][1]*d[2];
ans[2][0] = m[0][2]*d[0];
ans[2][1] = m[1][2]*d[1];
ans[2][2] = m[2][2]*d[2];
}
/* ----------------------------------------------------------------------
row vector times matrix
------------------------------------------------------------------------- */
inline void MathExtra::vecmat(const double *v, const double m[3][3],
double *ans)
{
ans[0] = v[0]*m[0][0] + v[1]*m[1][0] + v[2]*m[2][0];
ans[1] = v[0]*m[0][1] + v[1]*m[1][1] + v[2]*m[2][1];
ans[2] = v[0]*m[0][2] + v[1]*m[1][2] + v[2]*m[2][2];
}
/* ----------------------------------------------------------------------
matrix times scalar, in place
------------------------------------------------------------------------- */
inline void MathExtra::scalar_times3(const double f, double m[3][3])
{
m[0][0] *= f; m[0][1] *= f; m[0][2] *= f;
m[1][0] *= f; m[1][1] *= f; m[1][2] *= f;
m[2][0] *= f; m[2][1] *= f; m[2][2] *= f;
}
/* ----------------------------------------------------------------------
multiply 2 shape matrices
upper-triangular 3x3, stored as 6-vector in Voigt notation
------------------------------------------------------------------------- */
inline void MathExtra::multiply_shape_shape(const double *one,
const double *two, double *ans)
{
ans[0] = one[0]*two[0];
ans[1] = one[1]*two[1];
ans[2] = one[2]*two[2];
ans[3] = one[1]*two[3] + one[3]*two[2];
ans[4] = one[0]*two[4] + one[5]*two[3] + one[4]*two[2];
ans[5] = one[0]*two[5] + one[5]*two[1];
}
/* ----------------------------------------------------------------------
normalize a quaternion
------------------------------------------------------------------------- */
inline void MathExtra::qnormalize(double *q)
{
double norm = 1.0 / sqrt(q[0]*q[0] + q[1]*q[1] + q[2]*q[2] + q[3]*q[3]);
q[0] *= norm;
q[1] *= norm;
q[2] *= norm;
q[3] *= norm;
}
/* ----------------------------------------------------------------------
conjugate of a quaternion: qc = conjugate of q
assume q is of unit length
------------------------------------------------------------------------- */
inline void MathExtra::qconjugate(double *q, double *qc)
{
qc[0] = q[0];
qc[1] = -q[1];
qc[2] = -q[2];
qc[3] = -q[3];
}
/* ----------------------------------------------------------------------
vector-quaternion multiply: c = a*b, where a = (0,a)
------------------------------------------------------------------------- */
inline void MathExtra::vecquat(double *a, double *b, double *c)
{
c[0] = -a[0]*b[1] - a[1]*b[2] - a[2]*b[3];
c[1] = b[0]*a[0] + a[1]*b[3] - a[2]*b[2];
c[2] = b[0]*a[1] + a[2]*b[1] - a[0]*b[3];
c[3] = b[0]*a[2] + a[0]*b[2] - a[1]*b[1];
}
/* ----------------------------------------------------------------------
quaternion-vector multiply: c = a*b, where b = (0,b)
------------------------------------------------------------------------- */
inline void MathExtra::quatvec(double *a, double *b, double *c)
{
c[0] = -a[1]*b[0] - a[2]*b[1] - a[3]*b[2];
c[1] = a[0]*b[0] + a[2]*b[2] - a[3]*b[1];
c[2] = a[0]*b[1] + a[3]*b[0] - a[1]*b[2];
c[3] = a[0]*b[2] + a[1]*b[1] - a[2]*b[0];
}
/* ----------------------------------------------------------------------
quaternion-quaternion multiply: c = a*b
------------------------------------------------------------------------- */
inline void MathExtra::quatquat(double *a, double *b, double *c)
{
c[0] = a[0]*b[0] - a[1]*b[1] - a[2]*b[2] - a[3]*b[3];
c[1] = a[0]*b[1] + b[0]*a[1] + a[2]*b[3] - a[3]*b[2];
c[2] = a[0]*b[2] + b[0]*a[2] + a[3]*b[1] - a[1]*b[3];
c[3] = a[0]*b[3] + b[0]*a[3] + a[1]*b[2] - a[2]*b[1];
}
/* ----------------------------------------------------------------------
quaternion multiply: c = inv(a)*b
a is a quaternion
b is a four component vector
c is a three component vector
------------------------------------------------------------------------- */
inline void MathExtra::invquatvec(double *a, double *b, double *c)
{
c[0] = -a[1]*b[0] + a[0]*b[1] + a[3]*b[2] - a[2]*b[3];
c[1] = -a[2]*b[0] - a[3]*b[1] + a[0]*b[2] + a[1]*b[3];
c[2] = -a[3]*b[0] + a[2]*b[1] - a[1]*b[2] + a[0]*b[3];
}
/* ----------------------------------------------------------------------
compute quaternion from axis-angle rotation
v MUST be a unit vector
------------------------------------------------------------------------- */
inline void MathExtra::axisangle_to_quat(const double *v, const double angle,
double *quat)
{
double halfa = 0.5*angle;
double sina = sin(halfa);
quat[0] = cos(halfa);
quat[1] = v[0]*sina;
quat[2] = v[1]*sina;
quat[3] = v[2]*sina;
}
/* ----------------------------------------------------------------------
Apply principal rotation generator about x to rotation matrix m
------------------------------------------------------------------------- */
inline void MathExtra::rotation_generator_x(const double m[3][3],
double ans[3][3])
{
ans[0][0] = 0;
ans[0][1] = -m[0][2];
ans[0][2] = m[0][1];
ans[1][0] = 0;
ans[1][1] = -m[1][2];
ans[1][2] = m[1][1];
ans[2][0] = 0;
ans[2][1] = -m[2][2];
ans[2][2] = m[2][1];
}
/* ----------------------------------------------------------------------
Apply principal rotation generator about y to rotation matrix m
------------------------------------------------------------------------- */
inline void MathExtra::rotation_generator_y(const double m[3][3],
double ans[3][3])
{
ans[0][0] = m[0][2];
ans[0][1] = 0;
ans[0][2] = -m[0][0];
ans[1][0] = m[1][2];
ans[1][1] = 0;
ans[1][2] = -m[1][0];
ans[2][0] = m[2][2];
ans[2][1] = 0;
ans[2][2] = -m[2][0];
}
/* ----------------------------------------------------------------------
Apply principal rotation generator about z to rotation matrix m
------------------------------------------------------------------------- */
inline void MathExtra::rotation_generator_z(const double m[3][3],
double ans[3][3])
{
ans[0][0] = -m[0][1];
ans[0][1] = m[0][0];
ans[0][2] = 0;
ans[1][0] = -m[1][1];
ans[1][1] = m[1][0];
ans[1][2] = 0;
ans[2][0] = -m[2][1];
ans[2][1] = m[2][0];
ans[2][2] = 0;
}
#endif

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